Chapter 10.2, Problem 41E

(a)

To determine

To write: The equation of the circle that meets given conditions.

Answer to Problem 41E

  $x^2+y^2=36$

Explanation of Solution

Given information: A rectangle is inscribed in a circle centered at the origin with diameter 12.

  

Calculation:

Diameter of 12 means a radius of 6.

So the required equation is:

  $x^2+y^2=36$

(b)

To determine

To write: The dimensions of the rectangle in terms of x .

Answer to Problem 41E

  $\begin{array}{l}\text{The dimensions would be:}\\ 2x\times 2\sqrt{36-x^2}\end{array}$

Explanation of Solution

Given information: A rectangle is inscribed in a circle centered at the origin with diameter 12.

  

Calculation:

  

The dimensions of the rectangle would be that it is

  $2x\times 2y$

Since,

  $y=\sqrt{36-x^2},$

The dimensions would be:

  $2x\times 2\sqrt{36-x^2}$

(c)

To determine

To write:A function $A\left(x\right)$ that represents the area of the rectangle.

Answer to Problem 41E

  $A\left(x\right)=4x\sqrt{36-x^2}$

Explanation of Solution

Given information: A rectangle is inscribed in a circle centered at the origin with diameter 12.

  

Calculation:

  

The area would be the sum of the area of 4 of the “boxes” from the 1^st quadrant.

  $\begin{array}{l}{A}_{rect}=4xy\\ \text{Since }y=\sqrt{36-x^2}\\ A_{rect}=4x\sqrt{36-x^2}\end{array}$

(d)

To determine

To graph: The function $y=A\left(x\right),$ using a graphing calculator.

Answer to Problem 41E

The graph

Explanation of Solution

Given information: A rectangle is inscribed in a circle centered at the origin with diameter 12.

  

Calculation:

  $A=4x\sqrt{36-x^2}$

  

(e)

To determine

To find: The value of x , to the nearest tenth, that maximizes the area of the rectangle. What is the maximum area of the rectangle?

Answer to Problem 41E

  $\text{Maximum Area}=72u^2$

Explanation of Solution

Given information: A rectangle is inscribed in a circle centered at the origin with diameter 12.

  

Calculation:

  $x=4.24\text{ and the maximum area of 72}{u}^2$